Impulsive control problems under borel measurability

In this chapter, the complexity of the dynamical control system in the optimal control problem under extension increases. Herein, it is not linear w.r.t. x and u but is still linear w.r.t. the impulsive control variable. Moreover, the matrix-multiplier for the impulsive control depends on the conventional control u(· ) given by Borel functions. The right-hand side of the dynamical system is assumed to be Borel w.r.t. u. The results of the first chapter are derived for this more general formulation. The concept of extension itself does not change so far, as the space of Borel measures yet suffices to describe all feasible trajectories. The chapter ends with seven exercises. © 2019, Springer Nature Switzerland AG.

Авторы
Arutyunov A. 1, 2, 3 , Karamzin D. 4 , Lobo Pereira F.
Издательство
Springer Verlag
Язык
Английский
Страницы
19-38
Статус
Опубликовано
Том
477
Год
2019
Организации
  • 1 Moscow State University, Moscow, Russian Federation
  • 2 Institute of Control Sciences of the Russian Academy of Sciences, Moscow, Russian Federation
  • 3 RUDN University, Moscow, Russian Federation
  • 4 Federal Research Center “Computer Science and Control” of the Russian Academy of Sciences, Moscow, Russian Federation
  • 5 FEUP/DEEC, Porto University, Porto, Portugal
Ключевые слова
Dynamical systems; Borel function; Borel measures; Conventional control; Dynamical control systems; Impulsive controls; Optimal control problem; Right-hand sides; Optimal control systems
Дата создания
04.02.2019
Дата изменения
04.02.2019
Постоянная ссылка
https://repository.rudn.ru/ru/records/article/record/36164/
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